TY - JOUR
T1 - From Data to Causes III
T2 - Bayesian Priors for General Cross-Lagged Panel Models (GCLM)
AU - Zyphur, Michael J.
AU - Hamaker, Ellen L.
AU - Tay, Louis
AU - Voelkle, Manuel
AU - Preacher, Kristopher J.
AU - Zhang, Zhen
AU - Allison, Paul D.
AU - Pierides, Dean C.
AU - Koval, Peter
AU - Diener, Edward F.
N1 - Funding Information:
Funding. This research was supported by Australian Research Council?s Future Fellowship Scheme (project FT140100629).
Publisher Copyright:
© Copyright © 2021 Zyphur, Hamaker, Tay, Voelkle, Preacher, Zhang, Allison, Pierides, Koval and Diener.
PY - 2021/2/15
Y1 - 2021/2/15
N2 - This article describes some potential uses of Bayesian estimation for time-series and panel data models by incorporating information from prior probabilities (i.e., priors) in addition to observed data. Drawing on econometrics and other literatures we illustrate the use of informative “shrinkage” or “small variance” priors (including so-called “Minnesota priors”) while extending prior work on the general cross-lagged panel model (GCLM). Using a panel dataset of national income and subjective well-being (SWB) we describe three key benefits of these priors. First, they shrink parameter estimates toward zero or toward each other for time-varying parameters, which lends additional support for an income → SWB effect that is not supported with maximum likelihood (ML). This is useful because, second, these priors increase model parsimony and the stability of estimates (keeping them within more reasonable bounds) and thus improve out-of-sample predictions and interpretability, which means estimated effect should also be more trustworthy than under ML. Third, these priors allow estimating otherwise under-identified models under ML, allowing higher-order lagged effects and time-varying parameters that are otherwise impossible to estimate using observed data alone. In conclusion we note some of the responsibilities that come with the use of priors which, departing from typical commentaries on their scientific applications, we describe as involving reflection on how best to apply modeling tools to address matters of worldly concern.
AB - This article describes some potential uses of Bayesian estimation for time-series and panel data models by incorporating information from prior probabilities (i.e., priors) in addition to observed data. Drawing on econometrics and other literatures we illustrate the use of informative “shrinkage” or “small variance” priors (including so-called “Minnesota priors”) while extending prior work on the general cross-lagged panel model (GCLM). Using a panel dataset of national income and subjective well-being (SWB) we describe three key benefits of these priors. First, they shrink parameter estimates toward zero or toward each other for time-varying parameters, which lends additional support for an income → SWB effect that is not supported with maximum likelihood (ML). This is useful because, second, these priors increase model parsimony and the stability of estimates (keeping them within more reasonable bounds) and thus improve out-of-sample predictions and interpretability, which means estimated effect should also be more trustworthy than under ML. Third, these priors allow estimating otherwise under-identified models under ML, allowing higher-order lagged effects and time-varying parameters that are otherwise impossible to estimate using observed data alone. In conclusion we note some of the responsibilities that come with the use of priors which, departing from typical commentaries on their scientific applications, we describe as involving reflection on how best to apply modeling tools to address matters of worldly concern.
KW - Bayesian
KW - Granger causality (VAR)
KW - panel data model
KW - shrinkage estimation
KW - small-variance priors
UR - http://www.scopus.com/inward/record.url?scp=85101918620&partnerID=8YFLogxK
U2 - 10.3389/fpsyg.2021.612251
DO - 10.3389/fpsyg.2021.612251
M3 - Article
AN - SCOPUS:85101918620
SN - 1664-1078
VL - 12
SP - 1
EP - 13
JO - Frontiers in Psychology
JF - Frontiers in Psychology
M1 - 612251
ER -